Bülent Nafi Örnek, Süleyman Dirik, Mustafa Kandemir, “Some Results Associated with the Hyperbolic Sine Function”, Turkish Journal of Mathematics and Computer Science, 16:1 (2024), 177
Bülent Nafi Örnek, “A refinement of Schwarz's lemma at the boundary”, Ukr. Mat. Zhurn., 74:4 (2024), 515
Bülent Nafi Örnek, “A Refinement of Schwarz's Lemma at the Boundary”, Ukr Math J, 76:4 (2024), 573
В. Н. Дубинин, “Голоморфные ограниченные функции в круговом кольце”, Алгебра и анализ, 36:6 (2024), 30–46
О. С. Кудрявцева, А. П. Солодов, “Оценка второго коэффициента голоморфных отображений круга в себя с двумя неподвижными точками”, Матем. заметки, 113:5 (2023), 731–737; O. S. Kudryavtseva, A. P. Solodov, “Estimate of the Second Coefficient of Holomorphic Mappings of a Disk into Itself with Two Fixed Points”, Math. Notes, 113:5 (2023), 694–699
В. Н. Дубинин, “Граничное искажение и производная Шварца однолистной функции
в круговом кольце”, Матем. заметки, 113:6 (2023), 827–835; V. N. Dubinin, “Boundary Distortion and the Schwarzian Derivative of a Univalent Function in a Circular Annulus”, Math. Notes, 113:6 (2023), 776–783
Filippo Bracci, Daniela Kraus, Oliver Roth, “A new Schwarz-Pick lemma at the boundary and rigidity of holomorphic maps”, Advances in Mathematics, 432 (2023), 109262
T. Akyel, “Estimates for -spirallike function of complex order on the boundary”, Ukr. Mat. Zhurn., 74:1 (2022), 3
Bülent Nafi Örnek, Tuğba Akyel, 10TH INTERNATIONAL CONFERENCE ON APPLIED SCIENCE AND TECHNOLOGY, 2644, 10TH INTERNATIONAL CONFERENCE ON APPLIED SCIENCE AND TECHNOLOGY, 2022, 030012
B. N. Örnek, “Estimates for Analytic Functions Connected with Hankel Determinant”, Ukr Math J, 73:9 (2022), 1398
Bülent Nafi Örnek, Salih Berkan Aydemir, Timur Düzenli, Bilal Özak, “Some remarks on activation function design in complex extreme learning using Schwarz lemma”, Neurocomputing, 492 (2022), 23
Timur Duzenli, “Circuit Applications of Schwarz-Pick Lemma”, IEEE Trans. Circuits Syst. II, 69:1 (2022), 20
Oliver Roth, “The Nehari-Schwarz lemma and infinitesimal boundary rigidity of bounded holomorphic functions”, Stud. Univ. Babes-Bolyai Math., 67:2 (2022), 285
T. Akyel, “Estimates for λ-Spirallike Functions of Complex Order on the Boundary”, Ukr Math J, 74:1 (2022), 1
Bülent Nafi ÖRNEK, “SOME RESULTS ON JACK'S LEMMA FOR ANALYTIC FUNCTIONS”, Journal of Amasya University the Institute of Sciences and Technology, 3:2 (2022), 31
Selin Aydinoğlu, Nafi Örnek, “Estimates concerned with Hankel determinant for M(α) class”, Filomat, 36:11 (2022), 3679
Bülent Nafi Örnek, Salih Berkan Aydemir, Timur Düzenli, Bilal Özak, “A novel version of slime mould algorithm for global optimization and real world engineering problems”, Mathematics and Computers in Simulation, 198 (2022), 253
Timur DÜZENLİ, Bülent Nafi ÖRNEK, “Applications of the Carathéodory's Inequality for Driving Point Impedance Functions”, European Journal of Science and Technology, 2022
Bülent Nafi ÖRNEK, “SOME RESULTS ON THE SUBORDINATION PRINCIPLE FOR ANALYTIC FUNCTIONS”, Journal of Amasya University the Institute of Sciences and Technology, 3:1 (2022), 33
О. С. Кудрявцева, “Лемма Шварца и оценки коэффициентов
в случае прозвольного набора граничных неподвижных точек”, Матем. заметки, 109:4 (2021), 636–640; O. S. Kudryavtseva, “Schwarz's Lemma and Estimates of Coefficients in the Case of an Arbitrary Set of Boundary Fixed Points”, Math. Notes, 109:4 (2021), 653–657
V. N. Dubinin, “Some remarks on rotation theorems for complex polynomials”, Сиб. электрон. матем. изв., 18:1 (2021), 369–376
Selin Aydinoğlu, Bülent Nafi Örnek, “Applications of the Jack's lemma for the meromorphic functions”, J Anal, 29:3 (2021), 891
B. N. Örnek, “Estimates for analytic functions concerned with Hankel determinant”, Ukr. Mat. Zhurn., 73:9 (2021), 1205
Tuğba Akyel, Bülent Nafi Örnek, FOURTH INTERNATIONAL CONFERENCE OF MATHEMATICAL SCIENCES (ICMS 2020), 2334, FOURTH INTERNATIONAL CONFERENCE OF MATHEMATICAL SCIENCES (ICMS 2020), 2021, 030002
Bülent Nafi ÖRNEK, Timur DÜZENLİ, “SHARPENED FORMS FOR DRIVING POINT IMPEDANCE FUNCTIONS AT BOUNDARY OF RIGHT HALF PLANE”, Mühendislik Bilimleri ve Tasar{\i}m Dergisi, 9:4 (2021), 1093
Bülent Nafi ÖRNEK, Timur DÜZENLİ, “Rogosinski Lemmasıile ilgili Süren Nokta Empedans Fonksiyonlarıiçin Carathéodory Eşitsizliği”, DüMF Mühendislik Dergisi, 12:1 (2021), 61
V. N. Dubinin, “On holomorphic self-mappings of the unit disk”, Сиб. электрон. матем. изв., 16 (2019), 1633–1639
Bülent Nafi ÖRNEK, Timur DÜZENLİ, “Some Remarks on Positive Real Functions and Their Circuit Applications”, Bitlis Eren üniversitesi Fen Bilimleri Dergisi, 8:2 (2019), 617
Bülent Nafi ÖRNEK, Tuğba AKYEL, “Some remarks for a certain class of holomorphic functions at the boundary of the unit disc”, Sakarya University Journal of Science, 23:3 (2019), 446
Bülent Nafi Örnek, Timur Düzenli, “Schwarz lemma for driving point impedance functions and its circuit applications”, Circuit Theory & Apps, 47:6 (2019), 813
Tugba Akyel, Bulent Nafi Ornek, “Applications of the Jack's lemma for the meromorphic functions at the boundary”, B Soc Paran Mat, 38:7 (2019), 219
Bülent Nafi Örnek, Timur Düzenli, “On boundary analysis for derivative of driving point impedance functions and its circuit applications”, IET Circuits, Devices & Systems, 13:2 (2019), 145
Bulent Nafi Ornek, Timur Duzenli, “Boundary Analysis for the Derivative of Driving Point Impedance Functions”, IEEE Trans. Circuits Syst. II, 65:9 (2018), 1149
Peter R. Mercer, “An improved Schwarz Lemma at the boundary”, Open Mathematics, 16:1 (2018), 1140
Bulent Nafi Ornek, “Some lower bound for holomorphic functions at the boundary”, Malaya J. Mat., 06:01 (2018), 145
Selin Ayd{\i}noğlu, Bülent Nafi Örnek, “Applications of the Jack's lemma for the holomorphic functions”, Novi Sad J. Math., 48:2 (2018), 125
В. В. Горяйнов, “Голоморфные отображения единичного круга в себя с двумя неподвижными точками”, Матем. сб., 208:3 (2017), 54–71; V. V. Goryainov, “Holomorphic mappings of the unit disc into itself with two fixed points”, Sb. Math., 208:3 (2017), 360–376
Bülent Nafi Örnek, “Some estimates for angular derivative at the boundary”, Bul. Acad. Ştiinţe Repub. Mold. Mat., 2017, no. 3, 120–134
Goryainov V.V., “Some Inequalities For Holomorphic Self-Maps of the Unit Disc With Two Fixed Points”, Complex Analysis and Dynamical Systems Vii, Contemporary Mathematics, 699, eds. Agranovsky M., BenArtzi M., Beneteau C., Karp L., Khavinson D., Reich S., Shoikhet D., Weinstein G.,, Amer Mathematical Soc, 2017, 129–136
B. N. Örnek, “The Carathéodory inequality on the boundary for holomorphic functions in the unit disc”, Журн. матем. физ., анал., геом., 12:4 (2016), 287–301
BULENT NAFI ORNEK, TUGBA AKYEL, “AN IMPROVED LOWER BOUND FOR SCHWARZ LEMMA AT THE BOUNDARY”, The Pure and Applied Mathematics, 23:1 (2016), 61
Bulent Nafi Ornek, “INEQUALITIES FOR THE ANGULAR DERIVATIVES OF CERTAIN CLASSES OF HOLOMORPHIC FUNCTIONS IN THE UNIT DISC”, Bulletin of the Korean Mathematical Society, 53:2 (2016), 325
Bulent Nafi Ornek, “A SHARP CARATHÉODORY'S INEQUALITY ON THE BOUNDARY”, Communications of the Korean Mathematical Society, 31:3 (2016), 533
Tuğba Akyel, Bülent Nafi Örnek, “Sharpened forms of the generalized Schwarz inequality on the boundary”, Proc Math Sci, 126:1 (2016), 69
В. В. Горяйнов, “Эволюционные семейства конформных отображений с неподвижными точками и уравнение Лёвнера–Куфарева”, Матем. сб., 206:1 (2015), 39–68; V. V. Goryainov, “Evolution families of conformal mappings with fixed points and the Löwner-Kufarev equation”, Sb. Math., 206:1 (2015), 33–60
TUGBA AKYEL, NAFI ORNEK, “A SHARP SCHWARZ LEMMA AT THE BOUNDARY”, The Pure and Applied Mathematics, 22:3 (2015), 263
BULENT NAFI ORNEK, “CARATHÉODORY'S INEQUALITY ON THE BOUNDARY”, The Pure and Applied Mathematics, 22:2 (2015), 169
Bulent Nafi Ornek, “INEQUALITIES FOR THE NON-TANGENTIAL DERIVATIVE AT THE BOUNDARY FOR HOLOMORPHIC FUNCTION”, Communications of the Korean Mathematical Society, 29:3 (2014), 439
Mark Elin, Fiana Jacobzon, Marina Levenshtein, David Shoikhet, Harmonic and Complex Analysis and its Applications, 2014, 135
Azeroglu T.A., Ornek B.N., “A Refined Schwarz Inequality on the Boundary”, Complex Var. Elliptic Equ., 58:4, SI (2013), 571–577
Adam Lecko, Barbara Uzar, “A note on Julia-Carathéodory Theorem for functions with fixed initial coefficients”, Proc. Japan Acad. Ser. A Math. Sci., 89:10 (2013)
Bulent Nafi Ornek, “SHARPENED FORMS OF THE SCHWARZ LEMMA ON THE BOUNDARY”, Bulletin of the Korean Mathematical Society, 50:6 (2013), 2053
В. Н. Дубинин, “Методы геометрической теории функций в классических и современных задачах для полиномов”, УМН, 67:4(406) (2012), 3–88; V. N. Dubinin, “Methods of geometric function theory in classical and modern problems for polynomials”, Russian Math. Surveys, 67:4 (2012), 599–684
В. Н. Дубинин, “О граничных значениях производной Шварца регулярной функции”, Матем. сб., 202:5 (2011), 29–44; V. N. Dubinin, “Boundary values of the Schwarzian derivative of a regular function”, Sb. Math., 202:5 (2011), 649–663
В. Н. Дубинин, Д. Б. Карп, В. А. Шлык, “Избранные задачи геометрической теории функций и теории потенциала”, Дальневост. матем. журн., 8:1 (2008), 46–95
В. Н. Дубинин, В. Ю. Ким, “Теоремы искажения для регулярных и ограниченных в круге функций”, Аналитическая теория чисел и теория функций. 22, Зап. научн. сем. ПОМИ, 350, ПОМИ, СПб., 2007, 26–39; V. N. Dubinin, V. Yu. Kim, “Distortion theorems for bounded regular functions in the disk”, J. Math. Sci. (N. Y.), 150:3 (2008), 2018–2026
В. Н. Дубинин, “О применении леммы Шварца к неравенствам для целых функций с ограничениями на нули”, Аналитическая теория чисел и теория функций. 21, Зап. научн. сем. ПОМИ, 337, ПОМИ, СПб., 2006, 101–112; V. N. Dubinin, “Applications of the Schwarz lemma to inequalities for entire functions with constraints on zeros”, J. Math. Sci. (N. Y.), 143:3 (2007), 3069–3076
В. Н. Дубинин, Е. Г. Прилепкина, “О вариационных принципах конформных отображений”, Алгебра и анализ, 18:3 (2006), 39–62; V. N. Dubinin, E. G. Prilepkina, “On variational principles of conformal mappings”, St. Petersburg Math. J., 18:3 (2007), 373–389
В. Н. Дубинин, “Конформные отображения и неравенства для алгебраических полиномов. II”, Аналитическая теория чисел и теория функций. 19, Зап. научн. сем. ПОМИ, 302, ПОМИ, СПб., 2003, 18–37; V. N. Dubinin, “Conformal mappings and inequalities for algebraic polynomials. II”, J. Math. Sci. (N. Y.), 129:3 (2005), 3823–3834